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http://dx.doi.org/10.12941/jksiam.2010.14.4.249

VALUATION FUNCTIONALS AND STATIC NO ARBITRAGE OPTION PRICING FORMULAS  

Jeon, In-Tae (DEPT OF MATHEMATICS, THE CATHOLIC UNIVERSITY OF KOREA)
Park, Cheol-Ung (KOSCOM)
Publication Information
Journal of the Korean Society for Industrial and Applied Mathematics / v.14, no.4, 2010 , pp. 249-273 More about this Journal
Abstract
Often in practice, the implied volatility of an option is calculated to find the option price tomorrow or the prices of, nearby' options. To show that one does not need to adhere to the Black- Scholes formula in this scheme, Figlewski has provided a new pricing formula and has shown that his, alternating passive model' performs as well as the Black-Scholes formula [8]. The Figlewski model was modified by Henderson et al. so that the formula would have no static arbitrage [10]. In this paper, we show how to construct a huge class of such static no arbitrage pricing functions, making use of distortions, coherent risk measures and the pricing theory in incomplete markets by Carr et al. [4]. Through this construction, we provide a more elaborate static no arbitrage pricing formula than Black-Sholes in the above scheme. Moreover, using our pricing formula, we find a volatility curve which fits with striking accuracy the synthetic data used by Henderson et al. [10].
Keywords
static no arbitrage pricing; Figlewski's option pricing formula; coherent risk measure; incomplete market; volatility smile; valuation functional; Carr-Geman-Madan pricing formula;
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